Optimal Indirect Taxation under Imperfect Competition
Transcript of Optimal Indirect Taxation under Imperfect Competition
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No. E2010016 2010‐11
Optimal Indirect Taxation under Imperfect Competition
Hao Wang Associate Professor
China Center for Economic Research Peking University
No. E2010016 November 9, 2010
Abstract: This paper considers a simple general equilibrium model of indirect taxation under imperfect competition. Tax revenue is viewed as the rent of government coercion power and gross profit is viewed as the rent of market power. A government maximizes consumer surplus conditional on a certain amount of rent being collected. In contrast with many models in the literature, this model assumes that the government and consumers make their decisions simultaneously, which means the government cannot commit to a tax structure through its “first-mover advantage”. It is found that when all commodities are taxable, the optimal indirect taxes should equalize the after-tax Lerner indexes of all commodities. When consumers’ labor supplies are sufficiently inelastic, the optimal taxes generally lead to social welfare gain rather than deadweight loss.
Keywords: Indirect tax, Deadweight loss, Excess burden, Imperfect competition, Lerner
index
JEL classification: D59, H21, L16
Phone: 86-10-6275-8934, Email: [email protected], http://hwang.ccer.edu.cn/English.htm, I thank Been-Lon Chen, Lixing Li, Shin-Kun Peng, Ivan Png, C. C. Yang, and workshop participants at the Institute of Economics, Academia Sinica (Taiwan), for very helpful comments. All errors are mine.
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1. Introduction
It is often suggested that indirect or commodity taxes lead to deadweight loss or excess
burden. It is also suggested that an optimal indirect tax structure should prescribe higher
tax rates for commodities that have lower demand or supply elasticities, especially when the
demand functions are independent from each other (Ramsey, 1927; Hotelling, 1938; Baumol
and Bradford, 1970; Diamond, 1975; Myles, 1989; and others). Nevertheless Dixit (1970)
and Lerner (1970) suggest that when all goods are taxable, a uniform tax rate on all
commodities is social optimal.
Atkinson and Stiglitz (1972) argue that the conventional theories of optimal indirect
taxation are based on restrictive assumptions, like the absence of income effects and the
independence of demand functions. They consider a general equilibrium model of indirect
taxation. All commodities are taxable but leisure is not. A government maximizes
consumer surplus conditional on collecting a certain amount of tax revenue. Consumers
choose their optimal consumption bundles and labor supplies after observing the tax rates.
The paper characterizes the conditions that an optimal tax structure should satisfy. One of
the main results is that with additive utility functions, the government should tax more
heavily the goods that have low income elasticities of demand. As suggested by Slemrod
(1990) (p. 159), “why the apparently benign rule of uniform taxation is generally not optimal
should become clear once the second-best nature of the problem is understood … the optimal
tax pattern should take advantage of commodities’ relative substitutability or
complementarity with leisure. A complement to leisure, such as skis, should be taxed
relatively heavily and a substitute for leisure, such as work uniforms, should be taxed
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relatively lightly.”
The studies of indirect taxation under imperfect competition can be divided into two
branches, which are partial equilibrium approach and general equilibrium approach. The
partial equilibrium approach considers the optimal taxes for a small set of industries rather
than the whole economy. Anderson, Palma and Kreider (2001) consider the relative
efficiency of ad valorem and unit (or specific) taxes in imperfectly competitive markets.
They find that cost asymmetry, strategic value, market entry, and other factors may affect the
relative efficiency. Auerbach and Hines (2001) suggest that governments with perfect
information and access to lump-sum taxes can provide corrective subsidies that render
outcomes efficient in the presence of imperfect competition, while relaxing either of these
two conditions removes the government’s ability to support efficient resource allocation and
changes the perfect policy response. In the general equilibrium approach, firms may
engage in Cournot-Nash games (Gabszewicz and Vial, 1972) or Bertrand-Nash games
(Marschak and Selten, 1974; Benassy, 1988; Guesnerie and Laffont, 1978; Dillén, 1995).
One of the key issues is how indirect taxes help correcting the distortion caused by market
powers. For example, Dillén (1995) shows that under a set of conditions, a budget
constrained tax and subsidy system can correct the market inefficiency caused by imperfect
price competition.
The model of the current paper follows Atkinson and Stiglitz (1972). It assumes that
all commodities are taxable but leisure is not. The product markets are imperfectly
competitive, which means producer surpluses have to be taken into account in the welfare
analyses. In the model, tax revenue is viewed as the rent of government coercion power
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and gross profit is viewed as the rent of market power. A government can freely divide the
total rent between itself and firms, through corporate income taxes for instance. The
government maximizes consumer surplus conditional on a certain amount of rent being
collected. Consumers maximize their utilities by choosing their consumption bundles and
labor supplies. The consumers and government make decisions simultaneously. This
paper avoids modeling the specific games played in the various industries, but assumes that
stable equilibria prices always exist.1
A critical assumption of the model is that the government and consumers make their
decisions simultaneously. In contrast, Atkinson and Stiglitz (1972) and many other papers
implicitly assume that a government can commit to a tax structure through its first-mover
advantage. This timing allows the government to “strategically” influence consumer
choices. Just like a typical model that has a monopolistic first-mover, the government has
incentive to further adjust the tax rates after consumers make their decisions. Hence the
models also implicitly assume that the game is played for one round only. In the current
model, the government has no incentive to further adjust the tax rates at the equilibrium even
if it were allowed to do so.
This paper suggests that when all commodities are taxable, the optimal indirect tax
structure should equalize the after-tax Lerner indexes of all commodities.2 Hence the firms
with less market powers should be taxed more heavily and vice versa. Such a tax pattern
corrects the price distortion caused by market powers. This finding is in contrast with
1 In particular this paper does not explicitly define the objective of a firm. As suggested by Kreps (1990, pp. 727), Dierker and Dierker (2006), and others, it might be inappropriate to assume that firms simply maximize their profits in a general equilibrium model with imperfectly competition. 2 In the case of perfect competition, this tax rule is what Slemrod (1990) suggested “the apparently benign rule of uniform taxation”.
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Ramsey (1927)’s inverse price elasticity rule or Atkinson and Stiglitz (1972)’s inverse
income elasticity rule. The differences are due to the assumptions that all commodities are
taxable and the government does not have first-mover advantage. It is also shown that
when consumers’ labor supplies are sufficiently inelastic, the optimal indirect tax structure
generally leads to social welfare gain rather than deadweight loss. This is also in contrast
with the conventional view about indirect taxation.
The rest of this paper is organized as follows. Section 2 gives a review of the
conventional wisdom about the deadweight loss or excess burden caused by market power or
indirect taxation. Section 3 presents a simple model of indirect taxation under imperfect
competition. It characterizes the optimal indirect tax structure and analyzes its social
welfare effects. Section 4 concludes this paper.
2. Conventional wisdom about deadweight loss
In textbook presentations, the deadweight losses caused by market power and indirect tax are
pretty similar. In an imperfect competitive market like monopoly, oligopoly, or
monopolistic competition, firms are capable of setting producer prices above their marginal
costs. The resulted gross profits can be viewed as the rents of market powers.
Deadweight loss occurs when the firms’ rent from market power is less than consumers’ loss
from it, compared to the resource allocation under perfect competition. More accurately,
we say deadweight loss occurs if consumers are unable to attain the utility level under
perfect competition even if the firms’ rent were transferred to the consumers.
In economic textbooks the deadweight loss caused by market power is often illustrated
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by Figure 1. The argument is as follows. Starting from the equilibrium output level Q*, if
the economy can manage to produce one more unit of the product at the marginal cost
(which is slightly higher than the MC* in the figure) and sell it to the consumer who is
willing to pay the highest price (which is slightly lower than the p* in the figure), the total
social welfare would be improved (by an amount slightly less than * *p MC ). Therefore
the market power leads to inefficiently low output. The resulted welfare loss can be
represented by the area of triangle DL.
This argument implicitly assumes that all other commodity markets are perfectly
competitive. It ignores the fact that if a consumer spends more on the good in
consideration, the consumer may spend less on some other goods. If those markets are
imperfectly competitive and the commodities are priced above their marginal production
costs, spending less on those commodities would reduce the producer surplus there. This is
a welfare loss that must be accounted. It may offset the suggested welfare gain * *p MC .
MC*
Industrial marginal cost
p*
Figure 1: Deadweight loss and market power
Market demand
DL
Q* Output
Price
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Hence the argument fails.
Market powers cause social welfare loss when the “degree” of competition differs
across industries. In that case the relative prices cannot fully reflect the relative scarcities
of the commodities. Therefore the consumers’ choices are distorted, since the choices are
based on the relative prices. The market powers in different markets actually cancel out
with each other to some extent. In particular, if all commodities had the same proportional
markups, the price distortion would completely disappear. Hence the conventional view
generally overestimates the damage of market powers.3
The conventional wisdom about deadweight loss caused by indirect taxes is similar to
that caused by market power. The welfare loss is also represented by a triangle in a
demand-supply diagram, often referred as Harberger triangle in memory of Harberger’s
empirical work in estimating the losses (Harberger, 1964). We can similarly show that
when all commodities are taxable, the Harberger triangles may overestimate the welfare loss
caused by indirect taxation.
In Ramsey (1927), the society’s objective function is the “net utility” of production and
consumption. This approach is suitable in a partial equilibrium analysis, but might be
problematic in a general equilibrium analysis. Production costs are expressed in monetary
units, which are cardinal, but the utility from consumption is usually expressed ordinally.
Hence it might be problematic to use the arithmetic “net utility” as the society’s objective
function in a general equilibrium analysis. Therefore it should be implicitly assumed in
Ramsey (1927) that the analyses are conducted in a partial equilibrium framework rather
3 Market power may also cause welfare loss by distorting consumers’ labor supply, since it lowers the return from working.
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than a general equilibrium one. The Ramsey tax rule should be more sensible when many
commodities of the economy are not taxable.
3. The model
3.1 An imperfectly competitive economy
Consider a market economy with n commodities, denoted as 1, 2, …, n respectively. The
marginal production costs are assumed to be constant for simplicity, which are 1,..., nc c .4
The marginal costs are strictly positive. Define the “gross profit” of a firm with marginal
cost c and producer price p as )( cpx , where x is the quantity of output.5 Consumers are
identical. A representative consumer’s labor supply is denoted by L and his consumption
bundle is denoted by vector 1( ,..., )nx x x , which are non-negative. The consumer’s
utility function is 1( ,..., ; )nu x x L , which satisfies
0i
u
x
,
2
20
i
u
x
, 0
u
L
,
2
20
u
L
. (1)
Hence the marginal utility from consumption is positive and decreasing, and the marginal
“disutility” from working is positive and increasing. The income from labor supply is not
taxed and the wage rate is unity. All commodities are taxable. Denote the specific tax
rate on commodity i as it and denote 1( ,..., )nt t t . A tax rate could be negative, which
represents a subsidy. For any given tax structure, all industries are assumed to have stable
equilibrium prices. Denote the after-tax equilibrium price of commodity i as
4 The production costs of this paper refer to the “social production costs”. Hence the possible issues of externality or transaction cost are taken into account. 5 This should be the definition of “gross profit” when the model is extended to the case where firms have increasing marginal costs. In that case c represents the equilibrium marginal cost. Note that the “gross profit” of this paper differs from that in accounting.
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1( ) ( ,..., )i i np t p t t . Assume that for any relevant commodity bundle 1( ,..., )nx x x , the
market value of the bundle increase with each tax rate, i.e.,
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[ ( ) ]... 0n
ni i i
ppp t xx x
t t t
, {1,..., }i n . (2)
If the markets are perfectly competitive, we have ( )i i ip t c t . Hence the model has
perfect competition as a special case.
A benevolent government seeks to maximize the social welfare under two constraints.
First, it has to collect a certain amount of revenue to finance public services. Second, it has
to allow a certain amount of gross profits for firms to promote entrepreneurship and
investment. Define the total rent of the economy as the sum of tax revenue and gross
profits. Suppose that the government can figure out the optimal amount of total rent, and
can freely decide how to allocate the rent between firms and itself, through corporate income
taxes for instance. Hence the government seeks to maximize consumer surplus conditional
on a certain amount of rent being collected.
3.2 The optimal indirect taxes
Since consumers are identical, we only consider the behavior of a representative individual.
Denote the gross after-tax profit of the firms from each consumer as
1 1 1 1( ( ) ) ... ( ( ) )tn n n nx p t t c x p t t c , (3)
And denote the tax revenue of the government as
1 1 ... n nT x t x t . (4)
The sum t T is the rent from each consumer. A representative consumer’s available
resource for consumption includes wage L and the dividend he obtains from the firms, which
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is t . The dividend is viewed as a lump sum income by the consumer. Given a tax
structure 1( ,..., )nt t , the consumer solves utility-maximization problem
, 0Maxx L
1( ,..., ; )nu x x L , (5)
s.t. 1 1 ( ) ... ( ) tn nx p t x p t L . (6)
The Lagrangian of this problem can be written as
1 1 1( , ; ) ( ,..., ; ) ( ... )tn n nx t u x x L x p x p L L . (7)
The Lagrangian coefficient (i.e., the “shadow price” of wealth) is non-negative since
budget constraint (6) must be binding. Suppose there is an interior solution. Under
certain regularity conditions, say, ( )u is quasi-concave in 1( ,..., ; )nx x L , the consumer’s
optimal choice is characterized by following first order conditions.
ix : ( )ii
up t
x
, {1,..., }i n , (8)
L: u
L
, (9)
: 1 1 ( ) ... ( ) tn nx p t x p t L . (10)
From (8) we have following conditions for the utility maximization
( )
( )i i
jj
ux p t
u p tx
, for any , {1,..., }i j n , ji , (11)
On the other hand, given the consumer’s choice 1( ,..., ; )nx x L , the government chooses
1( ,..., )nt t to maximize consumer surplus conditional on a certain amount of rent being
collected. The government also understands that the consumer’s choice must satisfy a
budget constraint, which is (6). Hence it solves problem
, 0,Maxx L t
1( ,..., ; )nu x x L , (12)
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s.t. 1 1 ( ) ... ( ) tn nx p t x p t L , (13)
1 1 1( ( ) ) ... ( ( ) ) tn n nx p t c x p t c T . (14)
Note that t and T are exogenously determined.
The modeling of the government’s maximization problem is critical in characterizing the
optimal tax structure. There is a subtle difference between the model of Atkinson and
Stiglitz (1972) and the current one. Atkinson and Stiglitz substitute the first order
conditions of consumer’s utility-maximization problem into the government’s problem.
This approach implicitly assumes that the government chooses a tax structure first, and
consumers make their decisions after observing the tax rates. This timing allows the
government to “strategically” commit to a tax structure before consumers move. Therefore
at the end of the game the government wishes to adjust the tax rates further. In contrast, the
current paper does not allow the first-mover advantage of the government. The consumers
and government are assumed to move simultaneously. Technically, we will not substitute
conditions (8) into constraint (13) when we solve the government’s problem.
The Lagrangian of the government’s problem is
1 1 1
1 1 1
( , ; , ) ( ,..., ; ) ( ... )
[ ( ) ... ( ) ].
tn n n
tn n n
x t u x x L x p x p L
x p c x p c T
L (15)
Suppose there is an interior solution. The optimal tax rates satisfy following first order
conditions, which can be the sufficient conditions of the optimality under certain regularity
conditions.
ix : ( )i i ii
up p c
x
, {1,..., }i n , (16)
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it : 1 11 1( ... ) ( ... )n n
n ni i i i
p pp px x x x
t t t t
, {1,..., }i n , (17)
L: u
L
(18)
: 1 1 ... tn nx p x p L , (19)
: 1 1 1( ) ... ( ) tn n nx p c x p c T . (20)
From (2) and (17) we have , which means the social optimal tax structure entails
equal “shadow prices” of the two budget constraints. From (16) and , we have
i i
jj
ux c
u cx
, for any , {1,..., }i j n , ji . (21)
Note that a consumer’s choice rule under perfect competition without tax also takes the
form of (21). From the choice rule of the representative consumer (11) and that of the
government (21), we see the social optimal tax structure 1( ,..., )nt t satisfies
( )
( )i i
j j
p t c
p t c , for any , {1,..., }i j n , ji , (22)
Or equivalently we can write these equations in term of Lerner index, i.e.,
0 , such that ( )
( )i i
i
p t c
p t
, {1,..., }i n . (23)
This tax rule suggests that the optimal indirect taxes should correct the price distortions
caused by market power. From (19) and (20) we have
t
t
T
L
. (24)
This is the ratio between the total rent and private consumption. Under the optimal indirect
taxes, ratio represents the optimal markup of the economy. Hence it might be a useful
benchmark in welfare studies.
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As long as the government is able to use the n tax variables to control the n prices of the
commodities such that (22) or (23) holds, we have following result.
Proposition 1: An optimal indirect tax structure should equalize the after-tax Lerner index
of all commodities.
In order to correct the price distortion caused by market powers, the optimal taxes
should be discriminating across industries. Governments should tax more heavily the
industries that are more competitive. Lower tax rates or even subsidies should be imposed
on monopoly, oligopoly, or monopolistic competitive industries, especially those with very
low marginal costs. The optimal indirect taxation may lead to fairness problems because it
prescribes lower tax rates for firms with larger market powers. A well-designed corporate
income tax structure could be used to solve this problem. Of course at the aggregate level,
corporate income taxes also play the role of allocating the total rent between governments
and firms.
3.3 Do indirect taxes cause deadweight loss?
To consider the social welfare effect of the optimal indirect taxes, we need to compare three
market outcomes: the first-best outcome where all commodities are priced at their marginal
costs, the imperfectly competitive outcome without tax, and the imperfectly competitive
outcome with the optimal indirect taxes. It is helpful to introduce a notation before the
discussion. If a consumer faces price vector 1( ,..., )np p p and receives a lump sum
transfer H, he solves problem
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, 0Maxx L
1( ,..., ; )nu x x L , (25)
s.t. 1 1 ... n nx p x p L H . (26)
We denote the optimum value of the problem as
1 1( ,..., ; ) ( ( ; ),... ( ; ); ( , ))n LU p p H u x p L H x p L H L p H . (27)
This function is similar to the “indirect utility function” of consumers.
In the first-best outcome, the social welfare is simply the consumer surplus. Such a
resource allocation is characterized by problem
, 0Maxx L
1( ,..., ; )nu x x L , (28)
s.t. 1 1 ... n nx c x c L . (29)
Using the notation of (27), the first-best social welfare can be represented by 1( ,..., ;0)nU c c
for each consumer.
In a general equilibrium model with imperfect competition, the social welfare includes
consumer surplus, producer surplus and tax revenue, which are expressed differently.
Producer surplus and tax revenue are usually expressed in monetary units, but consumer
surplus is expressed in “utility”. Hence the arithmetic sum of them is not relevant. One
approach to evaluate the social welfare effect of indirect taxes is measuring the variation of
consumer welfare in term of a suitable price vector and then comparing that with the tax
revenue. If the measuring is based on the ex post price vector, the welfare change is called
“compensating variation”. If the measuring is based on the ex ante price vector, it is called
“equivalent variation” (Hicks, 1939). In the current model, since the after-tax (ex post)
prices are not distorted, it should be reasonable to use the compensating variation approach
to evaluate the social welfare effect of the taxes.
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We will hypothetically transfer the total rent of the firms and government back to the
consumers at the after-tax prices, and then compare the consumers’ wellbeing with that
without tax. The taxes are said to cause deadweight loss if the compensated wellbeing is
less than that without tax. It should be noted that when consumers are compensated at the
after-tax prices, they would necessarily consume more commodities and thus generate more
rents for the firms and government. The extra rents also have to be transferred to the
consumers. In other words, the amount of transfer is determined by the after-compensation
consumption. It is also important to realize that an individual consumer views the
compensation as a lump-sum transfer.
If there were no tax, the total gross profit of the firms is
01 1 1( (0) ) ... ( (0) )n n nx p c x p c . (30)
When the equilibrium without tax is not Pareto efficient, transferring 0 to consumers is
insufficient to “compensate” them back to the first-best situation. Hence the compensated
social welfare 01( (0),..., (0); )nU p p satisfies
01 1( (0),..., (0); ) ( ,..., ;0)n nU p p U c c . (31)
It is theoretically possible for (31) to hold in equality, which happens when the market
powers do not distort the relative prices of commodities and the labor supply is perfectly
inelastic. If
)0;,...,());0(),...,0(( 10
1 nn ccUppU , (32)
we say is the excess burden caused by market powers.
Now we consider the social welfare effect of the optimal indirect taxes. The total rent
collected from each consumer is
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1 1 1
1 1
( ( ) ) ... ( ( ) )
( ) ... ( ).
tn n n
n n
T x p t c x p t c
x p t x p t
(33)
A representative consumer’s utility-maximization problem with the compensation is
, 0Maxx L
1( ,..., ; )nu x x L , (34)
s.t. 1 1 ( ) ... ( ) tn nx p t x p t L T . (35)
Hence the consumer’s utility with the compensation is 1( ( ),..., ( ); )tnU p t p t T . Denote
the solution to the problem as 1( ,..., ; )nx x L . Note that L is the consumer’s labor supply
when the consumer faces the after-tax prices and compensated income. Both the substitute
effect and income effect of labor supply suggest that L might be less than the first-best
level. Consumption bundle 1( ,..., )nx x is also the solution to problem
0Max
x 1( ,..., ; )nu x x L , (36)
s.t. 1 1 ( ) ... ( ) tn nx p t x p t L T . (37)
Since rent t T is determined by the after-compensation consumption, we can substitute
(33) and ( )1
ii
cp t
into constraint (37). It becomes
1 1 ... n nx c x c L . (38)
Note that the transformation of (37) into (38) does not change the relative prices faced by the
consumer.
Since the indirect taxes may distort the labor supply, the consumer’s compensated utility
should be lower than that of the first-best. However, if consumers have perfectly inelastic
labor supplies,6 which means L is exogenously given, problem (36) with constraint (38)
6 The condition can be slightly weaker. What we really need is that the labor supply satisfies ( ) ( )L p L kp
for any relevant 0k . This condition means that consumers’ labor supplies do not change with the real wage rate.
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becomes identical to problem (28). Hence the outcome with the compensation is a
first-best one, i.e.,
1( ( ),..., ( ); )tnU p t p t T 1( ,..., ;0)nU c c . (39)
From (31) and (39) we have
01 1( ( ),..., ( ); ) ( (0),..., (0); )t
n nU p t p t T U p p . (40)
We write this result as following proposition.
Proposition 2: When consumers have perfectly inelastic labor supplies, the optimal indirect
tax structure generates potential Pareto improvement for the society.
Since function (.)U is typically continuous, Proposition 2 suggests that when the
market outcome without tax is not Pareto optimal and consumers’ labor supplies are
sufficiently inelastic, the optimal tax structure leads to welfare gain rather than deadweight
loss. Therefore if indirect taxes cause excess burden, it should be due to the suboptimality
of the tax structure or elastic labor supply. This finding is in contrast with the conventional
view about indirect taxation.
A change of wage rate leads to income effect and substitute effect on labor supply. The
two effects are often in opposite directions. Hence the elasticity of labor supply is an
empirical issue. Kosters (1967) finds very weak tax effects for male hours-of-work
equations for those who are working and somewhat stronger but still small effects on
participation. The findings are confirmed by MaCurdy, Green and Paarsch (1990). Mroz
(1987) finds similar weak tax effects on female hours of work for working women. See
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Slemrod (1990) and Heckman (1993) for reviews of the literature. Proposition 2 suggests
that with the optimal indirect taxes and an appropriate transfer payment system, it is possible
for a government to make all parties better off.
4. Concluding Remarks
This paper considers the optimal indirect taxation when a government cannot strategically
commit to a tax structure before consumers make their decisions. The model suggests that
when all commodities are taxable, an optimal indirect tax structure should equalize the
after-tax Lerner indexes of all commodities. This is true even when the commodities have
different relative substitutability or complementarity with leisure. Such a tax structure
corrects the price distortion caused by market powers. According to the model, the highly
competitive industries, like automobile, agriculture products, and base metals, which have
relatively low Lerner indices in the absence of taxes, should be taxed more heavily. Other
industries like software, communication services, and toll roads, should enjoy low indirect
tax rates. Another contribution of this paper is finding that when consumers’ labor supplies
are sufficiently inelastic, the optimal tax structure leads to potential Pareto improvement
rather than deadweight loss for the society. Therefore from the perspective of economic
efficiency, indirect taxation could be more preferable than direct taxation in collecting
revenue for governments.
This paper invokes some restrictive assumptions, for instances, the game is static, all
commodities are taxable, consumers are identical, information is perfect, market structures
are fixed, and stable equilibria always exist. It is left for future studies to observe what if
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some of the assumptions are not satisfied. The results of the current paper may serve as a
benchmark for more sophisticated studies.
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